If [tex]P[/tex] represents population, and [tex]x[/tex] represents the number of years after 2007, then we need to set [tex]P[/tex] to [tex]30,000[/tex] and solve for [tex]x[/tex], then add that to 2007.
[tex]30000 = 24455(1.03)x \Longleftrightarrow 30000 = 25188.65x[/tex]
Now divide each side by [tex]25188.65[/tex] to solve for [tex]x[/tex].
[tex]x = 1.19[/tex]
[tex]x[/tex] represents the number of years since 2007, so to get a year value, we need to add [tex]1.19[/tex] to 2007.
That gives you [tex]2008.119[/tex]. We don't represent years with decimals, so the answer would be 2008.
